Title :
Infinite elements and base functions for rotationally symmetric electromagnetic waves
Author :
Petre, Peter ; Zombory, LÁszlÓ
Author_Institution :
Dept. of Microwave Telecommun., Tech. Univ. of Budapest, Hungary
fDate :
10/1/1988 12:00:00 AM
Abstract :
The finite-element method is applicable to infinite domains if the outermost `finite´ elements are infinite and their base functions satisfy the boundary conditions at infinity. Appropriate infinite elements fitted to triangular or quadratic finite-element net and corresponding base functions satisfying Sommerfield´s radiation condition of electromagnetic waves are introduced. The application of the defined infinite elements is illustrated for the problem of the radiation of a coaxial cable to a half-space. The results are in very good agreement with those found in the literature
Keywords :
electromagnetic wave propagation; finite element analysis; base functions; boundary conditions; coaxial cable; finite-element method; infinite domains; propagation; rotationally symmetric electromagnetic waves; Boundary conditions; Coaxial cables; Differential equations; Electromagnetic propagation; Electromagnetic radiation; Electromagnetic scattering; Finite element methods; H infinity control; Permeability; Permittivity; Time factors;
Journal_Title :
Antennas and Propagation, IEEE Transactions on
